Perturbation analysis for denumerable markov chains with application to queueing models

Citation
Altman, Eitan et al., Perturbation analysis for denumerable markov chains with application to queueing models, Advances in applied probability , 36(2), 2004, pp. 839-853
ISSN journal
00018678
Volume
36
Issue
2
Year of publication
2004
Pages
839 - 853
Database
ACNP
SICI code
Abstract
We study the parametric perturbation of Markov chains with denumerable state spaces. We consider both regular and singular perturbations. By the latter we mean that transition probabilities of a Markov chain, with several ergodic classes, are perturbed such that (rare) transitions among the different ergodic classes of the unperturbed chain are allowed. Singularly perturbed Markov chains have been studied in the literature under more restrictive assumptions such as strong recurrence ergodicity or Doeblin conditions. We relax these conditions so that our results can be applied to queueing models (where the conditions mentioned above typically fail to hold). Assuming -geometric ergodicity, we are able to explicitly express the steady-state distribution of the perturbed Markov chain as a Taylor series in the perturbation parameter. We apply our results to quasi-birth-and-death processes and queueing models.